nearconvexity

Nearconvexity refers to a property of functions or sets in mathematical analysis and optimization that approximates or closely resembles convexity, yet may not strictly satisfy all conditions of convexity. The concept is primarily used in contexts where true convexity is too restrictive, and a softer, approximate version provides sufficient structure for analysis and algorithm development.

In the context of functions, a nearconvex function generally exhibits properties where the deviation from convexity

For sets, nearconvexity describes sets that are close to convex sets in a geometric sense. A nearconvex

The concept of nearconvexity has applications in economic theory, machine learning, and optimization, where it facilitates

Overall, nearconvexity serves as a bridge between convex and non-convex analysis, providing a framework for analyzing